Spectral theorems for positive algebra homomorphisms
Abstract
Let be a locally compact Hausdorff space, let be a partially ordered algebra, and let be a positive algebra homomorphism. Under conditions on that are satisfied in a good number of cases of practical interest, it is shown that is represented by a unique regular spectral measure on the Borel -algebra of , taking its values in the positive idempotents in . The measure , which is -additive in an ordered sense, represents via the order integral (a generalisation of the Lebesgue integral) that goes back to J.D.M. Wright and which was investigated earlier by the authors. The positive algebra homomorphism can be extended from to a positive linear map from the accompanying -space of into . It is shown that, quite often, this -space is closed under multiplication, so that it is a vector lattice algebra, and that the extended map from into is not only an algebra homomorphism but, even when is not a vector lattice, also a vector lattice homomorphism in a sense that is explained in the paper. When has the countable sup property, the image of (or of its positive cone) is described in terms of consecutive ups and downs of the image of (or of its positive cone). The general results are applied in three different contexts, showing how various spectral theorems have a common order-theoretical root: representations on Banach lattices, on Hilbert spaces, and (the algebra need not consist of operators) spectral theory for JBW-algebras.
Cite
@article{arxiv.2109.10690,
title = {Spectral theorems for positive algebra homomorphisms},
author = {Marcel de Jeu and Xingni Jiang},
journal= {arXiv preprint arXiv:2109.10690},
year = {2024}
}
Comments
61 pages. Extended version, with section on JBW-algebras added